The factorization method presented in this paper takes advantage of the special structures and properties of saddle point matrices. A variant of Gaussian elimination equivalent to the Cholesky's factorization is suggested and implemented for factorizing the saddle point matrices block-wise with small blocks of orders 1 and 2. The Gaussian elimination applied to these small blocks on block level also induces a block 3×3 structured factorization of which the blocks have special properties. We compare the new block factorization with the Schilders' factorization in terms of sparsity and computational complexity. The factorization can be used as a direct method, and also anticipate for preconditioning techniques. Keywords: Saddle point matrices...
Mastronardi and Van Dooren [SIAM J. Matrix Anal. Appl., 34 (2013), pp. 173–196] recently introduced ...
Abstract. In this paper we consider two structure prediction problems of interest in Gaussian elimin...
We consider symmetric saddle point matrices. We analyze block preconditioners based on the knowledge...
The factorization method presented in this paper takes advantage of the special structures and prope...
We present unique and existing micro-block and induced macro-block Crout-based factorizations for ma...
We transform and partition the symmetric indefinite (saddle point) matrices into a block structure w...
AbstractPartitioning a sparse matrix A is a useful device employed by a number of sparse matrix tech...
\u3cp\u3eThis paper focuses on efficiently solving large sparse symmetric indefinite systems of line...
This paper focuses on efficiently solving large sparse symmetric indefinite systems of linear equati...
This paper focuses on efficiently solving large sparse symmetric indefinite systems of linear equati...
This paper presents a drop-threshold incomplete LD\u3csup\u3e-1\u3c/sup\u3eL\u3csup\u3eT\u3c/sup\u3e...
Mastronardi and Van Dooren [SIAM J. Matrix Anal. Appl., 34 (2013), pp. 173--196] recently introduced...
The conditioning analysis of sparse approximate block factorizations of Stieltjes matrices developed...
Mastronardi and Van Dooren [SIAM J. Matrix Anal. Appl., 34 (2013), pp. 173–196] recently introduced ...
Abstract. In this paper we consider two structure prediction problems of interest in Gaussian elimin...
We consider symmetric saddle point matrices. We analyze block preconditioners based on the knowledge...
The factorization method presented in this paper takes advantage of the special structures and prope...
We present unique and existing micro-block and induced macro-block Crout-based factorizations for ma...
We transform and partition the symmetric indefinite (saddle point) matrices into a block structure w...
AbstractPartitioning a sparse matrix A is a useful device employed by a number of sparse matrix tech...
\u3cp\u3eThis paper focuses on efficiently solving large sparse symmetric indefinite systems of line...
This paper focuses on efficiently solving large sparse symmetric indefinite systems of linear equati...
This paper focuses on efficiently solving large sparse symmetric indefinite systems of linear equati...
This paper presents a drop-threshold incomplete LD\u3csup\u3e-1\u3c/sup\u3eL\u3csup\u3eT\u3c/sup\u3e...
Mastronardi and Van Dooren [SIAM J. Matrix Anal. Appl., 34 (2013), pp. 173--196] recently introduced...
The conditioning analysis of sparse approximate block factorizations of Stieltjes matrices developed...
Mastronardi and Van Dooren [SIAM J. Matrix Anal. Appl., 34 (2013), pp. 173–196] recently introduced ...
Abstract. In this paper we consider two structure prediction problems of interest in Gaussian elimin...
We consider symmetric saddle point matrices. We analyze block preconditioners based on the knowledge...